Fourier transform integral in S^3 by a Hopf fibration to S^2

htaati
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I do not know how to transform a Fourier transform integral in S^3
by a Hopf fibration to S^2. I have the three variables (r,theta ,phi)
in spherical polar coordinate,S^2 and (r,theta,phi and psi) for
S^3 where psi:[0..4*pi ]and theta:[0..pi ]and phi:[0..2*pi].
 
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Is there a reason why this is posted under "Set Theory, Logic, Probability & Statistics"?
 
I guess because a Hopf Map is a topological concept...and so it's related to set theory.
 
manifold

EnumaElish said:
Is there a reason why this is posted under "Set Theory, Logic, Probability & Statistics"?
this is a kind of error called tipo:smile:
however thanks a lot for your attention
 

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